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discriminanti

Discriminanti (plural) is a term used in mathematics to refer quantities associated with polynomials or equations that signal degeneracies or special configurations of roots or singularities. In univariate algebra, a discriminante measures how roots of a polynomial relate to each other and whether multiple roots occur.

For a polynomial f(x) = a_n x^n + … + a_0 with leading coefficient a_n, the discriminante Δ(f) is defined

Discriminants generalize beyond single-variable polynomials. They define the discriminant locus in families of curves: the set

Overall, discriminanti provide a compact way to summarize when algebraic objects lose generic behavior—such as acquiring

as
Δ(f)
=
a_n^{2n-2}
∏_{i<j}
(r_i
−
r_j)^2,
where
r_i
are
the
roots
of
f
in
its
splitting
field.
A
key
property
is
that
Δ(f)
=
0
if
and
only
if
f
has
a
repeated
root.
In
the
familiar
quadratic
case
f(x)
=
ax^2
+
bx
+
c,
the
discriminante
is
Δ
=
b^2
−
4ac,
which
determines
the
real
or
complex
nature
of
the
roots
and
whether
they
are
distinct.
of
parameter
values
for
which
the
corresponding
curve
has
a
singular
point.
In
algebraic
geometry,
this
helps
identify
degenerations
of
families
of
shapes.
In
number
theory,
the
discriminant
D_K
of
a
number
field
K
encodes
ramification
of
primes
in
the
field
and
relates
to
the
ring
of
integers,
capturing
arithmetic
complexity.
repeated
roots,
developing
singularities,
or
changing
arithmetic
properties—across
different
areas
of
mathematics.